传递有向图的Witten复形及其收敛性

Chonghu Wang, Xin Lai, Rongge Yu, Yaxuan Zheng, Bao-Ping Liu
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引用次数: 0

摘要

有向图是图的泛化,每条边都有一个或两个方向。对于每个有向图,存在一个包含它的传递有向图。此外,所有允许的初等路径的形式线性组合构成了传递有向图的路径复合体的一个基。因此,研究传递有向图上的离散Morse理论对于进一步研究一般有向图上的离散Morse理论具有重要意义。众所周知,有向图上的离散Morse函数的定义不同于单纯复形或单元复形上的离散Morse函数:有向图上的每个离散Morse函数都是一个离散的平面Witten-Morse函数。本文将通常的边界算子进行变形,代之以带参数的边界算子,并考虑引入拉普拉斯算子。此外,我们考虑了当参数趋于无穷时拉普拉斯算子的特征值趋于零的特征向量,定义了这些特征向量的生成空间,并进一步给出了有向图的Witten复形。最后,我们证明了对于传递有向图,Witten复趋近于它的Morse复。但是对于一般有向图,Morse复体的结构并不像传递有向图那样简单,关键路径与拉普拉斯算子特征值为零的特征向量没有直接关系。这在论文的最后部分进行了说明。
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Witten Complex of Transitive Digraph and Its Convergence
: Digraphs are generalization of graphs in which each edge is given one or two directions. For each digraph, there exists a transitive digraph containing it. Moreover, all the formal linear combinations of allowed elementary paths form a basis of the path complex for a transitive digraph. Hence, the study of discrete Morse theory on transitive digraphs is very important for the further study of discrete Morse theory on general digraphs. As we know, the definition of discrete Morse function on a digraph is different from that on a simplical complex or a cell complex: each discrete Morse function on a digraph is a discrete flat Witten-Morse function. In this paper, we deform the usual boundary operator, replacing it with a boundary operator with parameters and consider the induced Laplace operators. In addition, we consider the eigenvectors of the eigenvalues of the Laplace operator that approach to zero when the parameters approach infinity, define the generation space of these eigenvectors, and further give the Witten complex of digraphs. Finally, we prove that for a transitive digraph, Witten complex approaches to its Morse complex. However, for general digraphs, the structure of Morse complex is not as simple as that of transitive digraphs and the critical path is not directly related to the eigenvector with zero eigenvalue of Laplace operator. This is explained in the last part of the paper.
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来源期刊
CiteScore
3.10
自引率
4.00%
发文量
77
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